The Erdos-Ko-Rado Theorem in 2-Norm

Abstract

The codegree squared sum co2( F) of a family (hypergraph) F ⊂eq [n] k is defined to be the sum of codegrees squared d(E)2 over all E∈ [n]k-1, where d(E)=|\F∈ F: E⊂eq F\|. Given a family of k-uniform families H, Balogh, Clemen and Lidick\'y recently introduced the problem to determine the maximum codegree squared sum co2( F) over all H-free F. In the present paper, we consider the families which has as forbidden configurations all pairs of sets with intersection sizes less than t, that is, the well-known t-intersecting families. We prove the following Erdos-Ko-Rado Theorem in 2-norm, which confirms a conjecture of Brooks and Linz. Let t,k,n be positive integers such that t≤ k≤ n. If a family F⊂eq [n]k is t-intersecting, then for n (t+1)(k-t+1), we have \[ co2( F) n-tk-t(t+(n-k+1)(k-t)),\] equality holds if and only if F=\F∈ [n]k: T⊂ F\ for some t-subset T of [n]. In addition, we prove a Frankl-Hilton-Milner Theorem in 2-norm for t 2, and a generalized Tur\'an result, i.e., we determine the maximum number of copies of tight path of length 2 in t-intersecting families.